Analytic diffeomorphisms of the circle and topological Riemann-Roch theorem for circle fibrations
Abstract
We consider the group G which is the semidirect product of the group of analytic functions with values in C* on the circle and the group of analytic diffeomorphisms of the circle that preserve the orientation. Then we construct the central extensions of the group G by the group C*. The first central extension, so-called the determinant central extension, is constructed by means of determinants of linear operators acting in infinite-dimensional locally convex topological C-vector spaces. Other central extensions are constructed by -products of group 1-cocycles with the application to them the map related with algebraic K-theory. We prove in the second cohomology group, i.e. modulo of a group 2-coboundary, the equality of the 12th power of the 2-cocycle constructed by the first central extension and the product of integer powers of the 2-cocycles constructed above by means of -products (in multiplicative notation). As an application of this result we obtain a new topological Riemann-Roch theorem for a complex line bundle L on a smooth manifold M, where π :M B is a fibration in oriented circles. More precisely, we prove that in the group H3(B, Z) the element 12 \, [ Det (L)] is equal to the element 6 \, π* ( c1(L) c1(L)), where [ Det (L)] is the class of the determinant gerbe on B constructed by L and the determinant central extension.
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